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443 results on '"Balogh, F."'

1. Isotropic Grassmannians, Pl\'ucker and Cartan maps

Author

Balogh, F., Harnad, J., and Hurtubise, J.

Subjects
Mathematical Physics, Mathematics - Algebraic Geometry, Mathematics - Group Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 53Zxx, 20Cxx, 20G05, 20G45, 15A75, 15A66, 15A15, 14L35, 22E70
Abstract

This work is motivated by the relation between the KP and BKP integrable hierarchies, whose $\tau$-functions may be viewed as sections of dual determinantal and Pfaffian line bundles over infinite dimensional Grassmannians. In finite dimensions, we show how to relate the Cartan map which, for a vector space $V$ of dimension $N$, embeds the Grassmannian ${\mathrm {Gr}}^0_V(V+V^*)$ of maximal isotropic subspaces of $V+ V^*$, with respect to the natural scalar product, into the projectivization of the exterior space $\Lambda(V)$, and the Pl\"ucker map, which embeds the Grassmannian ${\mathrm {Gr}}_V(V+ V^*)$ of all $N$-planes in $V+ V^*$ into the projectivization of $\Lambda^N(V + V^*)$. The Pl\"ucker coordinates on ${\mathrm {Gr}}^0_V(V+V^*)$ are expressed bilinearly in terms of the Cartan coordinates, which are holomorphic sections of the dual Pfaffian line bundle ${\mathrm {Pf}}^* \rightarrow {\mathrm {Gr}}^0_V(V+V^*, Q)$. In terms of affine coordinates on the big cell, this is equivalent to an identity of Cauchy-Binet type, expressing the determinants of square submatrices of a skew symmetric $N \times N$ matrix as bilinear sums over the Pfaffians of their principal minors., Comment: References updated

Published
2020
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2. Discrete matrix models for partial sums of conformal blocks associated to Painlev\'e transcendents

Author

Balogh, F.

Subjects
Mathematical Physics, High Energy Physics - Theory, Mathematics - Classical Analysis and ODEs, 34M55
Abstract

A recently formulated conjecture of Gamayun, Iorgov and Lisovyy gives an asymptotic expansion of the Jimbo--Miwa--Ueno isomonodromic $\tau$-function for certain Painlev\'e transcendents. The coefficients in this expansion are given in terms of conformal blocks of a two-dimensional conformal field theory, which can be written as infinite sums over pairs of partitions. In this note a discrete matrix model is proposed on a lattice whose partition function can be used to obtain a multiple integral representation for the length restricted partial sums of the Painlev\'e conformal blocks. This leads to expressions of the partial sums involving H\"ankel determinants associated to the discrete measure of the matrix model, or equivalently, Wronskians of the corresponding moment generating function which is shown to be of the generalized hypergeometric type., Comment: 16 pages. v2: improved presentation, typos corrected

Published
2014
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3. Finite Dimensional KP \tau-functions I. Finite Grassmannians

Author

Balogh, F., Fonseca, T., and Harnad, J.

Subjects
Mathematical Physics, High Energy Physics - Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems
Abstract

We study \tau-functions of the KP hierarchy in terms of abelian group actions on finite dimensional Grassmannians, viewed as subquotients of the Hilbert space Grassmannians of Sato, Segal and Wilson. A determinantal formula of Gekhtman and Kasman involving exponentials of finite dimensional matrices is shown to follow naturally from such reductions. All reduced flows of exponential type generated by matrices with arbitrary nondegenerate Jordan forms are derived, both in the Grassmannian setting and within the fermionic operator formalism. A slightly more general determinantal formula involving resolvents of the matrices generating the flow, valid on the big cell of the Grassmannian, is also derived. An explicit expression is deduced for the Pl\"ucker coordinates appearing as coefficients in the Schur function expansion of the \tau-function., Comment: 45 pages. References updated

Published
2014
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4. Some Biorthogonal Families of Polynomials Arising in Noncommutative Quantum Mechanics

Author

Balogh, F., Shah, Nurisya M., and Ali, S. Twareque

Subjects
Mathematical Physics
Abstract

In this paper we study families of complex Hermite polynomials and construct deformed versions of them, using a $GL(2,\mathbb{C})$ transformation. This construction leads to the emergence of biorthogonal families of deformed complex Hermite polynomials, which we then study in the context of a two-dimensional model of noncommutative quantum mechanics., Comment: 17 pages

Published
2013
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5. On the norms and roots of orthogonal polynomials in the plane and $L^p$-optimal polynomials with respect to varying weights

Author

Balogh, F. and Bertola, M.

Subjects
Mathematics - Classical Analysis and ODEs, Mathematical Physics
Abstract

For a measure on a subset of the complex plane we consider $L^p$-optimal weighted polynomials, namely, monic polynomials of degree $n$ with a varying weight of the form $w^n = {\rm e}^{-n V}$ which minimize the $L^p$-norms, $1 \leq p \leq \infty$. It is shown that eventually all but a uniformly bounded number of the roots of the $L^p$-optimal polynomials lie within a small neighborhood of the support of a certain equilibrium measure; asymptotics for the $n$th roots of the $L^p$ norms are also provided. The case $p=\infty$ is well known and corresponds to weighted Chebyshev polynomials; the case $p=2$ corresponding to orthogonal polynomials as well as any other $1\leq p <\infty$ is our contribution.

Published
2009

6. Superharmonic Perturbations of a Gaussian Measure, Equilibrium Measures and Orthogonal Polynomials

Author

Balogh, F. and Harnad, J.

Subjects
Mathematical Physics, High Energy Physics - Theory, Mathematics - Complex Variables, 30C15, 31A05
Abstract

This work concerns superharmonic perturbations of a Gaussian measure given by a special class of positive weights in the complex plane of the form $w(z) = \exp(-|z|^2 + U^{\mu}(z))$, where $U^{\mu}(z)$ is the logarithmic potential of a compactly supported positive measure $\mu$. The equilibrium measure of the corresponding weighted energy problem is shown to be supported on subharmonic generalized quadrature domains for a large class of perturbing potentials $U^{\mu}(z)$. It is also shown that the $2\times 2$ matrix d-bar problem for orthogonal polynomials with respect to such weights is well-defined and has a unique solution given explicitly by Cauchy transforms. Numerical evidence is presented supporting a conjectured relation between the asymptotic distribution of the zeroes of the orthogonal polynomials in a semi-classical scaling limit and the Schwarz function of the curve bounding the support of the equilibrium measure, extending the previously studied case of harmonic polynomial perturbations with weights $w(z)$ supported on a compact domain., Comment: CRM preprint, 28 pages. To appear in: Complex Analysis and Operator Theory (Special volume in honour of Bjorn Gustafsson). Two references added (Oct. 2, 2008)

Published
2008
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7. Regularity of a vector potential problem and its spectral curve

Author

Balogh, F. and Bertola, M.

Subjects
Mathematical Physics
Abstract

In this note we study a minimization problem for a vector of measures subject to a prescribed interaction matrix in the presence of external potentials. The conductors are allowed to have zero distance from each other but the external potentials satisfy a growth condition near the common points. We then specialize the setting to a specific problem on the real line which arises in the study of certain biorthogonal polynomials (studied elsewhere) and we prove that the equilibrium measures solve a pseudo-algebraic curve under the assumption that the potentials are real analytic. In particular the supports of the equilibrium measures are shown to consist of a finite union of compact intervals., Comment: v2: Minor corrections suggested by referees

Published
2008

11. Az év szavai, 2022

Author

Balogh F., András, primary, Minya, Károly, additional, Pölcz, Ádám, additional, and Balázs, Géza, additional

Published
2023
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15. P578 Non-medical switch between adalimumab biosimilars and from the originator adalimumab to biosimilars in inflammatory bowel disease patients – a multicentre study on efficacy and drug sustainability

Author

Lontai, L, primary, Gonczi, L, additional, Balogh, F, additional, Komlodi, N, additional, Resal, T, additional, Farkas, K, additional, Molnar, T, additional, Golovics, P, additional, Schafer, E, additional, Szamosi, T, additional, Miheller, P, additional, Ilias, A, additional, and Lakatos, P L, additional

Published
2022
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29. P4202Determination of coronary flow reserve and absolute myocardial tissue perfusion on the basis of intracoronary pressure measurement and 3D coronary reconstruction

Author

Tar, B, primary, Jenei, C S, additional, Balogh, F, additional, Uveges, A, additional, Kiss, T, additional, Bugarin-Horvath, B, additional, Bakk, S, additional, Beres, Z, additional, Molnar, F, additional, Santa, J, additional, Svab, M, additional, Tokar, Z S, additional, Polgar, P, additional, and Koszegi, Z S, additional

Published
2018
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34. Zweiter Sitzungstag : Dienstag, den 17. September 1963, 9.00 Uhr und 15.00 Uhr

Author

Übelhör, R., Rummelhardt, S., Hienzsch, E., Marberger, H., Staehler, W., Devens, K., Petković, S., Lenko, Jan, Schultheis, Th., Vogler, E., Bergmann, M., Rodeck, G., Hettler, M., Stoianovici, St., Bocancea, D., Büscher, H.-K., Olanescu, G., Enfedjieff, M., Botscharoff, St., Klosterhalfen, H., Bandhauer, K., Baranyai, E., Pintér, J., Balogh, F., Hallwachs, O., Baumbusch, F., Loebenstein, H., Spängler, H., Kantschew, G., Menzel, E., Wahlqvist, L., Sartorius, H., Babics, A., Tschervenakov, A., Lutzeyer, W., Zillmer, H., Simons, E., Hanschke, H. J., Pecherstorfer, M., Jönsson, G., Zingg, E., Hornstein, O., Vahlensieck, W., Janca, K., Mellin, P., Pauer, F. J., Scheibe, G., Müller, H. G., Majewski, J., Körner, Fr., Gaca, A., Übelhör, R., and Rummelhardt, S., editor

Published
1965
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38. Finite Dimensional KP ��-functions I. Finite Grassmannians

Author

Balogh, F., Fonseca, T., and Harnad, J.

Subjects
High Energy Physics - Theory (hep-th), FOS: Physical sciences, Mathematical Physics (math-ph), Exactly Solvable and Integrable Systems (nlin.SI)
Abstract

We study ��-functions of the KP hierarchy in terms of abelian group actions on finite dimensional Grassmannians, viewed as subquotients of the Hilbert space Grassmannians of Sato, Segal and Wilson. A determinantal formula of Gekhtman and Kasman involving exponentials of finite dimensional matrices is shown to follow naturally from such reductions. All reduced flows of exponential type generated by matrices with arbitrary nondegenerate Jordan forms are derived, both in the Grassmannian setting and within the fermionic operator formalism. A slightly more general determinantal formula involving resolvents of the matrices generating the flow, valid on the big cell of the Grassmannian, is also derived. An explicit expression is deduced for the Pl��cker coordinates appearing as coefficients in the Schur function expansion of the ��-function., 45 pages. References updated

Published
2014
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40. Book reviews

Author

Szendrői, Z., Sarlós, I., Tankó, A., Balogh, F., Pethe, Gy., and Meggyes, B.

Published
1974
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43. Book reviews

Author

Jungmayer, J., Balogh, F., Rényi-Vámos, F., Szendrői, Z., Kelemen, Zs., Frang, D., Szabó, L., and Molnár, J.

Published
1976
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46. Book reviews

Author

Szendrői, Z., Beregi, E., Balogh, F., Csellár, M., Pugachev, A., Frang, D., Pytel, A., and Pethe, Gy.

Published
1976
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50. Book reviews

Author

Rényi-Vámos, F., Szabó, L., Pethe, Gy., Endes, P., Szendrői, Z., and Balogh, F.

Published
1975
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